Jump-preserving monitoring of dependent time series using pilot estimators
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Ansgar Steland
Abstract
An important problem of the statistical analysis of time series is to detect change-points in the mean structure. Since this problem is a one-dimensional version of the higher dimensional problem of detecting edges in images, we study detection rules which benefit from results obtained in image processing. For the sigma-filter studied there to detect edges, asymptotic bounds for the normed delay have been established for independent data. These results are considerably extended in two directions. First, we allow for dependent processes satisfying acertain conditional mixing property. Second, we allow for more general pilot estimators, e.g., the median, resulting in better detection properties. A simulation study indicates that our new procedure indeed performs much more better.
© 2003 Oldenbourg Wissenschaftsverlag GmbH
Articles in the same Issue
- Which power of goodness of fit tests can really be expected: intermediate versus contiguous alternatives
- Estimation of the multivariate normal covariance matrix under some restrictions
- Jump-preserving monitoring of dependent time series using pilot estimators
- Improved estimation of medians subject to order restrictions in unimodal symmetric families
Articles in the same Issue
- Which power of goodness of fit tests can really be expected: intermediate versus contiguous alternatives
- Estimation of the multivariate normal covariance matrix under some restrictions
- Jump-preserving monitoring of dependent time series using pilot estimators
- Improved estimation of medians subject to order restrictions in unimodal symmetric families
